Exact values of Kolmogorov widths of classes of analytic functions

Abstract

We prove that kernels of analytic functions of kind Hh,β(t)=Σk=1∞1 kh(kt-βπ2), h>0, β∈R, satisfies Kushpel's condition Cy,2n beginning with some number nh which is explicitly expressed by parameter h of smoothness of the kernel. As a consequence, for all n≥slant nh we obtain lower bounds for Kolmogorov widths d2n of functional classes that are representable as convolutions of kernel Hh,β with functions 1, which belong to the unit ball in the space L∞, in the space C. The obtained estimates coincide with the best uniform approximations by trigonometric polynomials for these classes. As a result, we obtain exact values for widths of mentioned classes of convolutions. Also for all n≥slant nh we obtain exact values for Kolmogorov widths d2n-1 of classes of convolutions of functions 1, which belong to the unit ball in the space L1, with kernel Hh,β in the space L1.